Your search keyword '"Jehad Alzabut"' showing total 81 results

1. The Stability Analysis of Linear Systems with Cauchy—Polynomial-Vandermonde Matrices

Author

Mutti-Ur Rehman, Jehad Alzabut, Nahid Fatima, and Tulkin H. Rasulov

Subjects

μ-values, singular values, eigenvalues, structured matrices, Mathematics, QA1-939

Abstract

The numerical approximation of both eigenvalues and singular values corresponding to a class of totally positive Bernstein–Vandermonde matrices, Bernstein–Bezoutian structured matrices, Cauchy—polynomial-Vandermonde structured matrices, and quasi-rational Bernstein–Vandermonde structured matrices are well studied and investigated in the literature. We aim to present some new results for the numerical approximation of the largest singular values corresponding to Bernstein–Vandermonde, Bernstein–Bezoutian, Cauchy—polynomial-Vandermonde and quasi-rational Bernstein–Vandermonde structured matrices. The numerical approximation for the reciprocal of the largest singular values returns the structured singular values. The new results for the numerical approximation of bounds from below for structured singular values are accomplished by computing the largest singular values of totally positive Bernstein–Vandermonde structured matrices, Bernstein–Bezoutian structured matrices, Cauchy—polynomial-Vandermonde structured matrices, and quasi-rational Bernstein–Vandermonde structured matrices. Furthermore, we present the spectral properties of totally positive Bernstein–Vandermonde structured matrices, Bernstein–Bezoutian structured matrices, Cauchy—polynomial-Vandermonde structured matrices, and structured quasi-rational Bernstein–Vandermonde matrices by computing the eigenvalues, singular values, structured singular values and its lower and upper bounds and condition numbers.

Published

2023

2. Passivity Analysis and Complete Synchronization of Fractional Order for Both Delayed and Non-Delayed Complex Dynamical Networks with Couplings in the Derivative

Author

S. Aadhithiyan, R. Raja, Jehad Alzabut, G. Rajchakit, and Ravi P. Agarwal

Subjects

passivity analysis, asymptotic synchronization, adaptive feedback control, parameter uncertainty, linear matrix inequality, Mathematics, QA1-939

Abstract

This manuscript explores the analysis of passivity and synchronization criteria for a complex fractional-order dynamical network model with derivative couplings and time-varying delays. The passivity problem of the proposed network model is deduced using various inequality methods and presented as a linear matrix inequality. To ensure complete synchronization for a fractional-order complex dynamical network with derivative couplings (CDNMDC), we derive suitable criteria using an adaptive feedback control method. Additionally, we investigate the synchronization criterion of these complex networks while accounting for parameter uncertainties. Finally, we provide an example to demonstrate the effectiveness of the proposed solutions.

Published

2023

3. On Stability of Second Order Pantograph Fractional Differential Equations in Weighted Banach Space

Author

Ridha Dida, Hamid Boulares, Abdelkader Moumen, Jehad Alzabut, Mohamed Bouye, and Yamina Laskri

Subjects

Caputo–Hadamard fractional derivative, pantograph fractional differential equations, Krasnoselskii’s fixed point theorem, asymptotic stability, Thermodynamics, QC310.15-319, Mathematics, QA1-939, Analysis, QA299.6-433

Abstract

This work investigates a weighted Banach space second order pantograph fractional differential equation. The considered equation is of second order, expressed in terms of the Caputo–Hadamard fractional operator, and constructed in a general manner to accommodate many specific situations. The asymptotic stability of the main equation’s trivial solution has been given. The primary theorem was demonstrated in a unique manner by employing the Krasnoselskii’s fixed point theorem. We provide a concrete example that supports the theoretical findings.

Published

2023

4. Nonlinear Dynamics of a Piecewise Modified ABC Fractional-Order Leukemia Model with Symmetric Numerical Simulations

Author

Hasib Khan, Jehad Alzabut, Wafa F. Alfwzan, and Haseena Gulzar

Subjects

piecewise modified ABC derivative, leukemia mathematical model, existence of solutions, Hyers–Ulam stability, crossover behavior, Mathematics, QA1-939

Abstract

In this study, we introduce a nonlinear leukemia dynamical system for a piecewise modified ABC fractional-order derivative and analyze it for the theoretical as well computational works and examine the crossover effect of the model. For the crossover behavior of the operators, we presume a division of the period of study [0,t2] in two subclasses as I1=[0,t1], I2=[t1,t2], for t1,t2∈R with t1

Published

2023

5. Solvability of Iterative Classes of Nonlinear Elliptic Equations on an Exterior Domain

Author

Xiaoming Wang, Jehad Alzabut, Mahammad Khuddush, and Michal Fečkan

Subjects

iterative class, elliptic equations, exterior domain, radial solutions, Banach space, complete metric space, Mathematics, QA1-939

Abstract

This work explores the possibility that iterative classes of elliptic equations have both single and coupled positive radial solutions. Our approach is based on using the well-known Guo–Krasnoselskii and Avery–Henderson fixed-point theorems in a Banach space. Furthermore, we utilize Rus’ theorem in a metric space, to prove the uniqueness of solutions for the problem. Examples are constructed for the sake of verification.

Published

2023

6. On System of Variable Order Nonlinear p-Laplacian Fractional Differential Equations with Biological Application

Author

Hasib Khan, Jehad Alzabut, Haseena Gulzar, Osman Tunç, and Sandra Pinelas

Subjects

variable order operators, p-Laplacian operator, Hyers–Ulam stability, existence and uniqueness of solutions, numerical scheme, Mathematics, QA1-939

Abstract

The study of variable order differential equations is important in science and engineering for a better representation and analysis of dynamical problems. In the literature, there are several fractional order operators involving variable orders. In this article, we construct a nonlinear variable order fractional differential system with a p-Laplacian operator. The presumed problem is a general class of the nonlinear equations of variable orders in the ABC sense of derivatives in combination with Caputo’s fractional derivative. We investigate the existence of solutions and the Hyers–Ulam stability of the considered equation. The presumed problem is a hybrid in nature and has a lot of applications. We have given its particular example as a waterborne disease model of variable order which is analysed for the numerical computations for different variable orders. The results obtained for the variable orders have an advantage over the constant orders in that the variable order simulations present the fluctuation of the real dynamics throughout our observations of the simulations.

Published

2023

7. A Fractional-Order Density-Dependent Mathematical Model to Find the Better Strain of Wolbachia

Author

Dianavinnarasi Joseph, Raja Ramachandran, Jehad Alzabut, Sayooj Aby Jose, and Hasib Khan

Subjects

fractional-order model, wAlbB strain, density-dependent death, CI, Wolbachia spread symmetry, Mathematics, QA1-939

Abstract

The primary objective of the current study was to create a mathematical model utilizing fractional-order calculus for the purpose of analyzing the symmetrical characteristics of Wolbachia dissemination among Aedesaegypti mosquitoes. We investigated various strains of Wolbachia to determine the most sustainable one through predicting their dynamics. Wolbachia is an effective tool for controlling mosquito-borne diseases, and several strains have been tested in laboratories and released into outbreak locations. This study aimed to determine the symmetrical features of the most efficient strain from a mathematical perspective. This was accomplished by integrating a density-dependent death rate and the rate of cytoplasmic incompatibility (CI) into the model to examine the spread of Wolbachia and non-Wolbachia mosquitoes. The fractional-order mathematical model developed here is physically meaningful and was assessed for equilibrium points in the presence and absence of disease. Eight equilibrium points were determined, and their local and global stability were determined using the Routh–Hurwitz criterion and linear matrix inequality theory. The basic reproduction number was calculated using the next-generation matrix method. The research also involved conducting numerical simulations to evaluate the behavior of the basic reproduction number for different equilibrium points and identify the optimal CI value for reducing disease spread.

Published

2023

8. Higher-Order Nabla Difference Equations of Arbitrary Order with Forcing, Positive and Negative Terms: Non-Oscillatory Solutions

Author

Jehad Alzabut, Said R. Grace, Jagan Mohan Jonnalagadda, Shyam Sundar Santra, and Bahaaeldin Abdalla

Subjects

non-oscillatory solutions, asymptotic behavior, caputo nabla fractional difference, nabla fractional difference equations, Mathematics, QA1-939

Abstract

This work provides new adequate conditions for difference equations with forcing, positive and negative terms to have non-oscillatory solutions. A few mathematical inequalities and the properties of discrete fractional calculus serve as the fundamental foundation to our approach. To help establish the main results, an analogous representation for the main equation, called a Volterra-type summation equation, is constructed. Two numerical examples are provided to demonstrate the validity of the theoretical findings; no earlier publications have been able to comment on their solutions’ non-oscillatory behavior.

Published

2023

9. Existence and Uniqueness Theorems for a Variable-Order Fractional Differential Equation with Delay

Author

Benoumran Telli, Mohammed Said Souid, Jehad Alzabut, and Hasib Khan

Subjects

fractional differential equations of variable order, fixed-point theorems, existence of solutions, Hyers–Ulam stability, Mathematics, QA1-939

Abstract

This study establishes the existence and stability of solutions for a general class of Riemann–Liouville (RL) fractional differential equations (FDEs) with a variable order and finite delay. Our findings are confirmed by the fixed-point theorems (FPTs) from the available literature. We transform the RL FDE of variable order to alternate RL fractional integral structure, then with the use of classical FPTs, the existence results are studied and the Hyers–Ulam stability is established by the help of standard notions. The approach is more broad-based and the same methodology can be used for a number of additional issues.

Published

2023

10. A Mathematical Tool to Investigate the Stability Analysis of Structured Uncertain Dynamical Systems with M-Matrices

Author

Mutti-Ur Rehman, Jehad Alzabut, Nahid Fatima, and Sajid Khan

Subjects

M-matrices, Hadamard product of matrices, dynamical system, perturbed eigenvalues, singular values, structured singular values, Mathematics, QA1-939

Abstract

The μ-value or structured singular value is a prominent mathematical tool to analyze and synthesize both the robustness and performance of time-invariant systems. We establish and analyze new results concerning structured singular values for the Hadamard product of real square M-matrices. The new results are obtained for structured singular values while considering a set of block diagonal uncertainties. The targeted uncertainties are of two types, that is, pure real scalar block uncertainties and real full-block uncertainties. The eigenvalue perturbation result is utilized in order to determine the behavior of the spectrum of perturbed matrices (A∘B)Δ(t) and ((A∘B)TΔ(t)+Δ(t)(A∘B)).

Published

2023

11. On Solutions of Fractional Integrodifferential Systems Involving Ψ-Caputo Derivative and Ψ-Riemann–Liouville Fractional Integral

Author

Hamid Boulares, Abdelkader Moumen, Khaireddine Fernane, Jehad Alzabut, Hicham Saber, Tariq Alraqad, and Mhamed Benaissa

Subjects

Ψ-Caputo derivative, Ψ-Riemann–Liouville fractional integral, monotone sequences, upper and lower solutions, Arzelà–Ascoli theorem, Mathematics, QA1-939

Abstract

In this paper, we investigate a new class of nonlinear fractional integrodifferential systems that includes the Ψ-Riemann–Liouville fractional integral term. Using the technique of upper and lower solutions, the solvability of the system is examined. We add two examples to demonstrate and validate the main result. The main results highlight crucial contributions to the general theory of fractional differential equations.

Published

2023

12. On Impulsive Implicit ψ-Caputo Hybrid Fractional Differential Equations with Retardation and Anticipation

Author

Abdelkrim Salim, Jehad Alzabut, Weerawat Sudsutad, and Chatthai Thaiprayoon

Subjects

fixed point theorem, ψ-Caputo fractional derivative, existence and uniqueness, Ulam–Hyers–Rassias stability, non-instantaneous impulses, Mathematics, QA1-939

Abstract

In this paper, we investigate the existence and Ulam–Hyers–Rassias stability results for a class of boundary value problems for implicit ψ-Caputo fractional differential equations with non-instantaneous impulses involving both retarded and advanced arguments. The results are based on the Banach contraction principle and Krasnoselskii’s fixed point theorem. In addition, the Ulam–Hyers–Rassias stability result is proved using the nonlinear functional analysis technique. Finally, illustrative examples are given to validate our main results.

Published

2022

13. On Non-Symmetric Fractal-Fractional Modeling for Ice Smoking: Mathematical Analysis of Solutions

Author

Anwar Shah, Hasib Khan, Manuel De la Sen, Jehad Alzabut, Sina Etemad, Chernet Tuge Deressa, and Shahram Rezapour

Subjects

ice smoking, fractal-fractional derivative, existence, stability, Lagrange polynomials, Mathematics, QA1-939

Abstract

Drugs have always been one of the most important concerns of families and government officials at all times, and they have caused irreparable damage to the health of young people. Given the importance of this great challenge, this article discusses a non-symmetric fractal-fractional order ice-smoking mathematical model for the existence results, numerical results, and stability analysis. For the existence of the solution of the given ice-smoking model, successive iterative sequences are defined. The uniqueness of the solution Hyers–Ulam (HU) stability is established with the help of the existing definitions and theorems in functional analysis. By the utilization of two-step Lagrange polynomials, we provide numerical solutions and provide a comparative numerical analysis for different values of the fractional order and fractal order. The numerical simulations show the applicability of the scheme and future prediction and the effects of fractal-fractional orders simultaneously.

Published

2022

14. New Results for Homoclinic Fractional Hamiltonian Systems of Order α∈(1/2,1]

Author

Abdelkader Moumen, Hamid Boulares, Jehad Alzabut, Fathi Khelifi, and Moheddine Imsatfia

Subjects

fractional Hamiltonian systems, Mountain Pass Theorem, genus properties critical point, Thermodynamics, QC310.15-319, Mathematics, QA1-939, Analysis, QA299.6-433

Abstract

In this manuscript, we are interested in studying the homoclinic solutions of fractional Hamiltonian system of the form −D∞ας(Dςα−∞Z(ς))−A(ς)Z(ς)+∇ω(ς,Z(ς))=0, where α∈(12,1], Z∈Hα(R,RN) and ω∈C1(R×RN,R) are not periodic in ς. The characteristics of the critical point theory are used to illustrate the primary findings. Our results substantially improve and generalize the most recent results of the proposed system. We conclude our study by providing an example to highlight the significance of the theoretical results.

Published

2022

15. On the Global Behaviour of Solutions for a Delayed Viscoelastic-Type Petrovesky Wave Equation with p-Laplacian Operator and Logarithmic Source

Author

Bochra Belhadji, Jehad Alzabut, Mohammad Esmael Samei, and Nahid Fatima

Subjects

global existence, energy decay, viscoelastic wave equation, strong damping, p-Laplacian, logarithmic nonlinearity, Mathematics, QA1-939

Abstract

This research is concerned with a nonlinear p-Laplacian-type wave equation with a strong damping and logarithmic source term under the null Dirichlet boundary condition. We establish the global existence of the solutions by using the potential well method. Moreover, we prove the stability of the solutions by the Nakao technique. An example with illustrative figures is provided as an application.

Published

2022

16. Nonlocal Impulsive Fractional Integral Boundary Value Problem for (ρk,ϕk)-Hilfer Fractional Integro-Differential Equations

Author

Marisa Kaewsuwan, Rachanee Phuwapathanapun, Weerawat Sudsutad, Jehad Alzabut, Chatthai Thaiprayoon, and Jutarat Kongson

Subjects

(ρ,ϕ)-Hilfer fractional derivative, impulsive conditions, integral multi-point boundary conditions, fixed point theorems, Ulam–Hyers stability, Mathematics, QA1-939

Abstract

In this paper, we establish the existence and stability results for the (ρk,ϕk)-Hilfer fractional integro-differential equations under instantaneous impulse with non-local multi-point fractional integral boundary conditions. We achieve the formulation of the solution to the (ρk,ϕk)-Hilfer fractional differential equation with constant coefficients in term of the Mittag–Leffler kernel. The uniqueness result is proved by applying Banach’s fixed point theory with the Mittag–Leffler properties, and the existence result is derived by using a fixed point theorem due to O’Regan. Furthermore, Ulam–Hyers stability and Ulam–Hyers–Rassias stability results are demonstrated via the non-linear functional analysis method. In addition, numerical examples are designed to demonstrate the application of the main results.

Published

2022

17. A Generalized Approach of the Gilpin–Ayala Model with Fractional Derivatives under Numerical Simulation

Author

Manel Amdouni, Jehad Alzabut, Mohammad Esmael Samei, Weerawat Sudsutad, and Chatthai Thaiprayoon

Subjects

asymptotically, periodic functions, Gilpin–Ayala prey-predator, Mathematics, QA1-939

Abstract

In this article, we study the existence and uniqueness of multiple positive periodic solutions for a Gilpin–Ayala predator-prey model under consideration by applying asymptotically periodic functions. The result of this paper is completely new. By using Comparison Theorem and some technical analysis, we showed that the classical nonlinear fractional model is bounded. The Banach contraction mapping principle was used to prove that the model has a unique positive asymptotical periodic solution. We provide an example and numerical simulation to inspect the correctness and availability of our essential outcomes.

Published

2022

18. Stability of Boundary Value Discrete Fractional Hybrid Equation of Second Type with Application to Heat Transfer with Fins

Author

Wafa Shammakh, A. George Maria Selvam, Vignesh Dhakshinamoorthy, and Jehad Alzabut

Subjects

fractional order, discrete, Mittag–Leffler function, boundary value problems, Hyers Ulam stability, Mathematics, QA1-939

Abstract

The development in the qualitative theory of fractional differential equations is accompanied by discrete analog which has been studied intensively in recent past. Suitable fixed point theorem is to be selected to study the boundary value discrete fractional equations due to the properties exhibited by fractional difference operators. This article aims at investigating the stability results in the sense of Hyers and Ulam with application of Mittag–Leffler function hybrid fractional order difference equation of second type. The symmetric structure of the operators defined in this article is vital in establishing the existence results by using Krasnoselkii’s fixed point theorem. Banach contraction mapping principle and Krasnoselkii’s fixed point theorem are employed to establish the uniqueness and existence results for solution of fractional order discrete equation. A problem on heat transfer with fins is provided as an application to considered hybrid type fractional order difference equation and the stability results are demonstrated with simulations.

Published

2022

19. Oscillation Results for Solutions of Fractional-Order Differential Equations

Author

Jehad Alzabut, Ravi P. Agarwal, Said R. Grace, and Jagan M. Jonnalagadda

Subjects

fractional derivative, fractional differential equation, oscillation, Thermodynamics, QC310.15-319, Mathematics, QA1-939, Analysis, QA299.6-433

Abstract

This survey paper is devoted to succinctly reviewing the recent progress in the field of oscillation theory for linear and nonlinear fractional differential equations. The paper provides a fundamental background for all interested researchers who would like to contribute to this topic.

Published

2022

20. The Dual Characterization of Structured and Skewed Structured Singular Values

Author

Mutti-Ur Rehman, Jehad Alzabut, Taqwa Ateeq, Jutarat Kongson, and Weerawat Sudsutad

Subjects

eigenvalues, singular values, structured singular values, skewed structured singular values, Mathematics, QA1-939

Abstract

The structured singular values and skewed structured singular values are the well-known mathematical quantities and bridge the gap between linear algebra and system theory. It is well-known fact that an exact computation of these quantities is NP-hard. The NP-hard nature of structured singular values and skewed structured singular values allow us to provide an estimations of lower and upper bounds which guarantee the stability and instability of feedback systems in control. In this paper, we present new results on the dual characterization of structured singular values and skewed structured singular values. The results on the estimation of upper bounds for these two quantities are also computed.

Published

2022

21. Existence of Solutions for Coupled Higher-Order Fractional Integro-Differential Equations with Nonlocal Integral and Multi-Point Boundary Conditions Depending on Lower-Order Fractional Derivatives and Integrals

Author

Muthaiah Subramanian, Jehad Alzabut, Mohamed I. Abbas, Chatthai Thaiprayoon, and Weerawat Sudsutad

Subjects

coupled system, integro-differential equations, Caputo derivatives, multi-point, integral boundary conditions, fixed point theorems, Mathematics, QA1-939

Abstract

In this article, we investigate the existence and uniqueness of solutions for a nonlinear coupled system of Liouville–Caputo type fractional integro-differential equations supplemented with non-local discrete and integral boundary conditions. The nonlinearity relies both on the unknown functions and their fractional derivatives and integrals in the lower order. The consequence of existence is obtained utilizing the alternative of Leray–Schauder, while the result of uniqueness is based on the concept of Banach contraction mapping. We introduced the concept of unification in the present work with varying parameters of the multi-point and classical integral boundary conditions. With the help of examples, the main results are well demonstrated.

Published

2022

22. Dynamical Analysis of Nutrient-Phytoplankton-Zooplankton Model with Viral Disease in Phytoplankton Species under Atangana-Baleanu-Caputo Derivative

Author

Songkran Pleumpreedaporn, Chanidaporn Pleumpreedaporn, Jutarat Kongson, Chatthai Thaiprayoon, Jehad Alzabut, and Weerawat Sudsutad

Subjects

Atangana-Baleanu-Caputo fractional derivative, fixed-point theorems, numerical simulations, nutrient-phytoplankton-zooplankton, Ulam-Hyres stability, Mathematics, QA1-939

Abstract

A mathematical model of the nutrient-phytoplankton-zooplankton associated with viral infection in phytoplankton under the Atangana-Baleanu derivative in Caputo sense is investigated in this study. We prove the theoretical results for the existence and uniqueness of the solutions by using Banach’s and Sadovskii’s fixed point theorems. The notion of various Ulam’s stability is used to guarantee the context of the stability analysis. Furthermore, the equilibrium points and the basic reproduction numbers for the proposed model are provided. The Adams type predictor-corrector algorithm has been applied for the theoretical confirmation to establish the approximate solutions. A variety of numerical plots corresponding to various fractional orders between zero and one are presented to describe the dynamical behavior of the fractional model under consideration.

Published

2022

23. A Chebyshev Collocation Approach to Solve Fractional Fisher–Kolmogorov–Petrovskii–Piskunov Equation with Nonlocal Condition

Author

Dapeng Zhou, Afshin Babaei, Seddigheh Banihashemi, Hossein Jafari, Jehad Alzabut, and Seithuti P. Moshokoa

Subjects

fractional Fisher–Kolmogorov–Petrovskii–Piskunov equation, collocation scheme, sixth-kind Chebyshev polynomials, convergence analysis, Thermodynamics, QC310.15-319, Mathematics, QA1-939, Analysis, QA299.6-433

Abstract

We provide a detailed description of a numerical approach that makes use of the shifted Chebyshev polynomials of the sixth kind to approximate the solution of some fractional order differential equations. Specifically, we choose the fractional Fisher–Kolmogorov–Petrovskii–Piskunov equation (FFKPPE) to describe this method. We write our approximate solution in the product form, which consists of unknown coefficients and shifted Chebyshev polynomials. To compute the numerical values of coefficients, we use the initial and boundary conditions and the collocation technique to create a system of equations whose number matches the unknowns. We test the applicability and accuracy of this numerical approach using two examples.

Published

2022

24. A Study of Generalized Hybrid Discrete Pantograph Equation via Hilfer Fractional Operator

Author

Wafa Shammakh, A. George Maria Selvam, Vignesh Dhakshinamoorthy, and Jehad Alzabut

Subjects

fractional order, discrete time, hilfer operator, pantograph, stability, Thermodynamics, QC310.15-319, Mathematics, QA1-939, Analysis, QA299.6-433

Abstract

Pantograph, a device in which an electric current is collected from overhead contact wires, is introduced to increase the speed of trains or trams. The work aims to study the stability properties of the nonlinear fractional order generalized pantograph equation with discrete time, using the Hilfer operator. Hybrid fixed point theorem is considered to study the existence of solutions, and the uniqueness of the solution is proved using Banach contraction theorem. Stability results in the sense of Ulam and Hyers, and its generalized form of stability for the considered initial value problem are established and we depict numerical simulations to demonstrate the impact of the fractional order on stability.

Published

2022

25. A Survey on the Oscillation of Solutions for Fractional Difference Equations

Author

Jehad Alzabut, Ravi P. Agarwal, Said R. Grace, Jagan M. Jonnalagadda, A. George Maria Selvam, and Chao Wang

Subjects

fractional order, forward (delta) difference equation, backward (nabla) difference equation, oscillation of solutions, Mathematics, QA1-939

Abstract

In this paper, we present a systematic study concerning the developments of the oscillation results for the fractional difference equations. Essential preliminaries on discrete fractional calculus are stated prior to giving the main results. Oscillation results are presented in a subsequent order and for different types of equations. The investigation was carried out within the delta and nabla operators.

Published

2022

26. Novel Generalized Proportional Fractional Integral Inequalities on Probabilistic Random Variables and Their Applications

Author

Weerawat Sudsutad, Nantapat Jarasthitikulchai, Chatthai Thaiprayoon, Jutarat Kongson, and Jehad Alzabut

Subjects

fractional expectation, fractional variance, fractional moment, proportional fractional integral operator, integral inequality, random variable, Mathematics, QA1-939

Abstract

This study investigates a variety of novel estimations involving the expectation, variance, and moment functions of continuous random variables by applying a generalized proportional fractional integral operator. Additionally, a continuous random variable with a probability density function is presented in context of the proportional Riemann–Liouville fractional integral operator. We establish some interesting results of the proportional fractional expectation, variance, and moment functions. In addition, constructive examples are provided to support our conclusions. Meanwhile, we discuss a few specific examples that may be extrapolated from our primary results.

Published

2022

27. Improved Results on Finite-Time Passivity and Synchronization Problem for Fractional-Order Memristor-Based Competitive Neural Networks: Interval Matrix Approach

Author

Pratap Anbalagan, Raja Ramachandran, Jehad Alzabut, Evren Hincal, and Michal Niezabitowski

Subjects

memristor, fractional-order competitive neural networks, finite-time passivity, finite-time boundedness, finite-time synchronization, Thermodynamics, QC310.15-319, Mathematics, QA1-939, Analysis, QA299.6-433

Abstract

This research paper deals with the passivity and synchronization problem of fractional-order memristor-based competitive neural networks (FOMBCNNs) for the first time. Since the FOMBCNNs’ parameters are state-dependent, FOMBCNNs may exhibit unexpected parameter mismatch when different initial conditions are chosen. Therefore, the conventional robust control scheme cannot guarantee the synchronization of FOMBCNNs. Under the framework of the Filippov solution, the drive and response FOMBCNNs are first transformed into systems with interval parameters. Then, the new sufficient criteria are obtained by linear matrix inequalities (LMIs) to ensure the passivity in finite-time criteria for FOMBCNNs with mismatched switching jumps. Further, a feedback control law is designed to ensure the finite-time synchronization of FOMBCNNs. Finally, three numerical cases are given to illustrate the usefulness of our passivity and synchronization results.

Published

2022

28. Analysis of Impulsive Boundary Value Pantograph Problems via Caputo Proportional Fractional Derivative under Mittag–Leffler Functions

Author

Bounmy Khaminsou, Weerawat Sudsutad, Chatthai Thaiprayoon, Jehad Alzabut, and Songkran Pleumpreedaporn

Subjects

fixed point theorems, impulsive condition, boundary value problems, existence theory, fractional differential equation, Thermodynamics, QC310.15-319, Mathematics, QA1-939, Analysis, QA299.6-433

Abstract

This manuscript investigates an extended boundary value problem for a fractional pantograph differential equation with instantaneous impulses under the Caputo proportional fractional derivative with respect to another function. The solution of the proposed problem is obtained using Mittag–Leffler functions. The existence and uniqueness results of the proposed problem are established by combining the well-known fixed point theorems of Banach and Krasnoselskii with nonlinear functional techniques. In addition, numerical examples are presented to demonstrate our theoretical analysis.

Published

2021

29. Monotone Iterative and Upper–Lower Solution Techniques for Solving the Nonlinear ψ−Caputo Fractional Boundary Value Problem

Author

Abdelatif Boutiara, Maamar Benbachir, Jehad Alzabut, and Mohammad Esmael Samei

Subjects

extremal solutions, monotone iterative technique, ψ-Caputo fractional derivative, upper and lower solutions, Thermodynamics, QC310.15-319, Mathematics, QA1-939, Analysis, QA299.6-433

Abstract

The objective of this paper is to study the existence of extremal solutions for nonlinear boundary value problems of fractional differential equations involving the ψ−Caputo derivative CDa+σ;ψϱ(t)=V(t,ϱ(t)) under integral boundary conditions ϱ(a)=λIν;ψϱ(η)+δ. Our main results are obtained by applying the monotone iterative technique combined with the method of upper and lower solutions. Further, we consider three cases for ψ*(t) as t, Caputo, 2t, t, and Katugampola (for ρ=0.5) derivatives and examine the validity of the acquired outcomes with the help of two different particular examples.

Published

2021

30. Using Fractional Bernoulli Wavelets for Solving Fractional Diffusion Wave Equations with Initial and Boundary Conditions

Author

Monireh Nosrati Sahlan, Hojjat Afshari, Jehad Alzabut, and Ghada Alobaidi

Subjects

fractional bernoulli wavelets, operational matrix, diffusion wave equation, Klein–Gordon equation, Thermodynamics, QC310.15-319, Mathematics, QA1-939, Analysis, QA299.6-433

Abstract

In this paper, fractional-order Bernoulli wavelets based on the Bernoulli polynomials are constructed and applied to evaluate the numerical solution of the general form of Caputo fractional order diffusion wave equations. The operational matrices of ordinary and fractional derivatives for Bernoulli wavelets are set via fractional Riemann–Liouville integral operator. Then, these wavelets and their operational matrices are utilized to reduce the nonlinear fractional problem to a set of algebraic equations. For solving the obtained system of equations, Galerkin and collocation spectral methods are employed. To demonstrate the validity and applicability of the presented method, we offer five significant examples, including generalized Cattaneo diffusion wave and Klein–Gordon equations. The implementation of algorithms exposes high accuracy of the presented numerical method. The advantage of having compact support and orthogonality of these family of wavelets trigger having sparse operational matrices, which reduces the computational time and CPU requirements.

Published

2021

31. Analysis of a Nonlinear ψ-Hilfer Fractional Integro-Differential Equation Describing Cantilever Beam Model with Nonlinear Boundary Conditions

Author

Kanoktip Kotsamran, Weerawat Sudsutad, Chatthai Thaiprayoon, Jutarat Kongson, and Jehad Alzabut

Subjects

cantilever beam problem, ψ-Hilfer fractional derivative, existence and uniqueness, nonlinear condition, fixed point theorem, Ulam–Hyers stability, Thermodynamics, QC310.15-319, Mathematics, QA1-939, Analysis, QA299.6-433

Abstract

In this paper, we establish sufficient conditions to approve the existence and uniqueness of solutions of a nonlinear implicit ψ-Hilfer fractional boundary value problem of the cantilever beam model with nonlinear boundary conditions. By using Banach’s fixed point theorem, the uniqueness result is proved. Meanwhile, the existence result is obtained by applying the fixed point theorem of Schaefer. Apart from this, we utilize the arguments related to the nonlinear functional analysis technique to analyze a variety of Ulam’s stability of the proposed problem. Finally, three numerical examples are presented to indicate the effectiveness of our results.

Published

2021

32. Investigation of the Fractional Strongly Singular Thermostat Model via Fixed Point Techniques

Author

Mohammed K. A. Kaabar, Mehdi Shabibi, Jehad Alzabut, Sina Etemad, Weerawat Sudsutad, Francisco Martínez, and Shahram Rezapour

Subjects

boundary conditions, hybrid differential equation, fractional thermostat model, strong singularity, the Caputo derivative, α-ψ-contraction, Mathematics, QA1-939

Abstract

Our main purpose in this paper is to prove the existence of solutions for the fractional strongly singular thermostat model under some generalized boundary conditions. In this way, we use some recent nonlinear fixed-point techniques involving α-ψ-contractions and α-admissible maps. Further, we establish the similar results for the hybrid version of the given fractional strongly singular thermostat control model. Some examples are studied to illustrate the consistency of our results.

Published

2021

33. Monotone Iterative Method for ψ-Caputo Fractional Differential Equation with Nonlinear Boundary Conditions

Author

Zidane Baitiche, Choukri Derbazi, Jehad Alzabut, Mohammad Esmael Samei, Mohammed K. A. Kaabar, and Zailan Siri

Subjects

ψ-Caputo operator, extremal solutions, monotone iterative style, upper (lower) solutions, boundary conditions, Thermodynamics, QC310.15-319, Mathematics, QA1-939, Analysis, QA299.6-433

Abstract

The main contribution of this paper is to prove the existence of extremal solutions for a novel class of ψ-Caputo fractional differential equation with nonlinear boundary conditions. For this purpose, we utilize the well-known monotone iterative technique together with the method of upper and lower solutions. Finally, we provide an example along with graphical representations to confirm the validity of our main results.

Published

2021

34. The Existence, Uniqueness, and Stability Analysis of the Discrete Fractional Three-Point Boundary Value Problem for the Elastic Beam Equation

Author

Jehad Alzabut, A. George Maria Selvam, R. Dhineshbabu, and Mohammed K. A. Kaabar

Subjects

Riemann–Liouville fractional difference operator, boundary value problem, discrete fractional calculus, existence and uniqueness, Ulam stability, elastic beam problem, Mathematics, QA1-939

Abstract

An elastic beam equation (EBEq) described by a fourth-order fractional difference equation is proposed in this work with three-point boundary conditions involving the Riemann–Liouville fractional difference operator. New sufficient conditions ensuring the solutions’ existence and uniqueness of the proposed problem are established. The findings are obtained by employing properties of discrete fractional equations, Banach contraction, and Brouwer fixed-point theorems. Further, we discuss our problem’s results concerning Hyers–Ulam (HU), generalized Hyers–Ulam (GHU), Hyers–Ulam–Rassias (HUR), and generalized Hyers–Ulam–Rassias (GHUR) stability. Specific examples with graphs and numerical experiment are presented to demonstrate the effectiveness of our results.

Published

2021

35. Some Fixed Point Results of Weak-Fuzzy Graphical Contraction Mappings with Application to Integral Equations

Author

Shamoona Jabeen, Zhiming Zheng, Mutti-Ur Rehman, Wei Wei, and Jehad Alzabut

Subjects

fuzzy cone metric space, fixed point, weak-contraction, graph structure, Mathematics, QA1-939

Abstract

The present paper aims to introduce the concept of weak-fuzzy contraction mappings in the graph structure within the context of fuzzy cone metric spaces. We prove some fixed point results endowed with a graph using weak-fuzzy contractions. By relaxing the continuity condition of mappings involved, our results enrich and generalize some well-known results in fixed point theory. With the help of new lemmas, our proofs are straight forward. We furnish the validity of our findings with appropriate examples. This approach is completely new and will be beneficial for the future aspects of the related study. We provide an application of integral equations to illustrate the usability of our theory.

Published

2021

36. Asymptotic Stability of Nonlinear Discrete Fractional Pantograph Equations with Non-Local Initial Conditions

Author

Jehad Alzabut, A. George Maria Selvam, Rami A. El-Nabulsi, Vignesh Dhakshinamoorthy, and Mohammad E. Samei

Subjects

fractional pantograph equations, fractional difference equation, asymptotic stability, caputo difference operator, Mathematics, QA1-939

Abstract

Pantograph, the technological successor of trolley poles, is an overhead current collector of electric bus, electric trains, and trams. In this work, we consider the discrete fractional pantograph equation of the form Δ∗β[k](t)=wt+β,k(t+β),k(λ(t+β)), with condition k(0)=p[k] for t∈N1−β, 0<β≤1, λ∈(0,1) and investigate the properties of asymptotic stability of solutions. We will prove the main results by the aid of Krasnoselskii’s and generalized Banach fixed point theorems. Examples involving algorithms and illustrated graphs are presented to demonstrate the validity of our theoretical findings.

Published

2021

37. Controlling Wolbachia Transmission and Invasion Dynamics among Aedes Aegypti Population via Impulsive Control Strategy

Author

Joseph Dianavinnarasi, Ramachandran Raja, Jehad Alzabut, Michał Niezabitowski, and Ovidiu Bagdasar

Subjects

sustainability, mosquito borne diseases, Aedes Aegypti, Wolbachia invasion, impulsive control, Mathematics, QA1-939

Abstract

This work is devoted to analyzing an impulsive control synthesis to maintain the self-sustainability of Wolbachia among Aedes Aegypti mosquitoes. The present paper provides a fractional order Wolbachia invasive model. Through fixed point theory, this work derives the existence and uniqueness results for the proposed model. Also, we performed a global Mittag-Leffler stability analysis via Linear Matrix Inequality theory and Lyapunov theory. As a result of this controller synthesis, the sustainability of Wolbachia is preserved and non-Wolbachia mosquitoes are eradicated. Finally, a numerical simulation is established for the published data to analyze the nature of the proposed Wolbachia invasive model.

Published

2021

38. New Criteria on Oscillatory and Asymptotic Behavior of Third-Order Nonlinear Dynamic Equations with Nonlinear Neutral Terms

Author

Said R. Grace, Jehad Alzabut, and Abdullah Özbekler

Subjects

oscillation, asymptotic behavior, nonlinear neutral term, third-order dynamic equations, Science, Astrophysics, QB460-466, Physics, QC1-999

Abstract

In the paper, we provide sufficient conditions for the oscillatory and asymptotic behavior of a new type of third-order nonlinear dynamic equations with mixed nonlinear neutral terms. Our theorems not only improve and extend existing theorems in the literature but also provide a new approach as far as the nonlinear neutral terms are concerned. The main results are illustrated by some particular examples.

Published

2021

39. Non-Linear Neutral Differential Equations with Damping: Oscillation of Solutions

Author

Saad Althobati, Jehad Alzabut, and Omar Bazighifan

Subjects

even-order equations, non-linear equations, oscillation, Riccati substitution, comparison technique, Mathematics, QA1-939

Abstract

The oscillation of non-linear neutral equations contributes to many applications, such as torsional oscillations, which have been observed during earthquakes. These oscillations are generally caused by the asymmetry of the structures. The objective of this work is to establish new oscillation criteria for a class of nonlinear even-order differential equations with damping. We employ different approach based on using Riccati technique to reduce the main equation into a second order equation and then comparing with a second order equation whose oscillatory behavior is known. The new conditions complement several results in the literature. Furthermore, examining the validity of the proposed criteria has been demonstrated via particular examples.

Published

2021

40. Stability Analysis of an LTI System with Diagonal Norm Bounded Linear Differential Inclusions

Author

Mutti-Ur Rehman, Sohail Iqbal, Jehad Alzabut, and Rami Ahmad El-Nabulsi

Subjects

linear differential inclusion, spectrum of an operator, differential equations, Mathematics, QA1-939

Abstract

In this article, we present a stability analysis of linear time-invariant systems in control theory. The linear time-invariant systems under consideration involve the diagonal norm bounded linear differential inclusions. We propose a methodology based on low-rank ordinary differential equations. We construct an equivalent time-invariant system (linear) and use it to acquire an optimization problem whose solutions are given in terms of a system of differential equations. An iterative method is then used to solve the system of differential equations. The stability of linear time-invariant systems with diagonal norm bounded differential inclusion is studied by analyzing the Spectrum of equivalent systems.

Published

2021

41. Computing Nearest Correlation Matrix via Low-Rank ODE’s Based Technique

Author

Mutti-Ur Rehman, Jehad Alzabut, and Kamaleldin Abodayeh

Subjects

positive semi-definiteness, gradient system of ODEs, eigenvalues, Mathematics, QA1-939

Abstract

For n-dimensional real-valued matrix A, the computation of nearest correlation matrix; that is, a symmetric, positive semi-definite, unit diagonal and off-diagonal entries between −1 and 1 is a problem that arises in the finance industry where the correlations exist between the stocks. The proposed methodology presented in this article computes the admissible perturbation matrix and a perturbation level to shift the negative spectrum of perturbed matrix to become non-negative or strictly positive. The solution to optimization problems constructs a gradient system of ordinary differential equations that turn over the desired perturbation matrix. Numerical testing provides enough evidence for the shifting of the negative spectrum and the computation of nearest correlation matrix.

Published

2020

42. Stability Analysis of Linear Feedback Systems in Control

Author

Mutti-Ur Rehman, Jehad Alzabut, and Muhammad Fazeel Anwar

Subjects

singular values, structured singular values, low-rank approximation, Mathematics, QA1-939

Abstract

This article presents a stability analysis of linear time invariant systems arising in system theory. The computation of upper bounds of structured singular values confer the stability analysis, robustness and performance of feedback systems in system theory. The computation of the bounds of structured singular values of Toeplitz and symmetric Toeplitz matrices for linear time invariant systems is presented by means of low rank ordinary differential equations (ODE’s) based methodology. The proposed methodology is based upon the inner-outer algorithm. The inner algorithm constructs and solves a gradient system of ODE’s while the outer algorithm adjusts the perturbation level with fast Newton’s iteration. The comparison of bounds of structured singular values approximated by low rank ODE’s based methodology results tighter bounds when compared with well-known MATLAB routine mussv, available in MATLAB control toolbox.

Published

2020

43. Quadratic Stability of Non-Linear Systems Modeled with Norm Bounded Linear Differential Inclusions

Author

Mutti-Ur Rehman, Jehad Alzabut, and Arfan Hyder

Subjects

quadratic stability, Lyapunov function, gradient system of ODE’s, bounded linear differential inclusion, Mathematics, QA1-939

Abstract

In this article we present an ordinary differential equation based technique to study the quadratic stability of non-linear dynamical systems. The non-linear dynamical systems are modeled with norm bounded linear differential inclusions. The proposed methodology reformulate non-linear differential inclusion to an equivalent non-linear system. Lyapunov function demonstrate the existence of a symmetric positive definite matrix to analyze the stability of non-linear dynamical systems. The proposed method allows us to construct a system of ordinary differential equations to localize the spectrum of perturbed system which guarantees the stability of non-linear dynamical system.

Published

2020

44. Oscillatory Behavior of a Type of Generalized Proportional Fractional Differential Equations with Forcing and Damping Terms

Author

Jehad Alzabut, James Viji, Velu Muthulakshmi, and Weerawat Sudsutad

Subjects

generalized proportional fractional operator, oscillation criteria, nonoscillatory behavior, damping and forcing terms, Mathematics, QA1-939

Abstract

In this paper, we study the oscillatory behavior of solutions for a type of generalized proportional fractional differential equations with forcing and damping terms. Several oscillation criteria are established for the proposed equations in terms of Riemann-Liouville and Caputo settings. The results of this paper generalize some existing theorems in the literature. Indeed, it is shown that for particular choices of parameters, the obtained conditions in this paper reduce our theorems to some known results. Numerical examples are constructed to demonstrate the effectiveness of the our main theorems. Furthermore, we present and illustrate an example which does not satisfy the assumptions of our theorem and whose solution demonstrates nonoscillatory behavior.

Published

2020

45. On Instability Analysis of Linear Feedback Systems

Author

Mutti-Ur Rehman and Jehad Alzabut

Subjects

doubly stochastic matrices, eigenvalues, singular values, structured singular values, ordinary differential equations, Electronic computers. Computer science, QA75.5-76.95

Abstract

The numerical approximation of the μ -value is key towards the measurement of instability, stability analysis, robustness, and the performance of linear feedback systems in system theory. The MATLAB function mussv available in MATLAB Control Toolbox efficiently computes both lower and upper bounds of the μ -value. This article deals with the numerical approximations of the lower bounds of μ -values by means of low-rank ordinary differential equation (ODE)-based techniques. The numerical simulation shows that approximated lower bounds of μ -values are much tighter when compared to those obtained by the MATLAB function mussv.

Published

2020

46. On Spectral Properties of Doubly Stochastic Matrices

Author

Mutti-Ur Rehman, Jehad Alzabut, Javed Hussain Brohi, and Arfan Hyder

Subjects

doubly stochastic matrices, eigenvalues, singular values, sturctured singular values, odes, Mathematics, QA1-939

Abstract

The relationship among eigenvalues, singular values, and quadratic forms associated with linear transforms of doubly stochastic matrices has remained an important topic since 1949. The main objective of this article is to present some useful theorems, concerning the spectral properties of doubly stochastic matrices. The computation of the bounds of structured singular values for a family of doubly stochastic matrices is presented by using low-rank ordinary differential equations-based techniques. The numerical computations illustrating the behavior of the method and the spectrum of doubly stochastic matrices is then numerically analyzed.

Published

2020

47. Existence, Uniqueness and Exponential Stability of Periodic Solution for Discrete-Time Delayed BAM Neural Networks Based on Coincidence Degree Theory and Graph Theoretic Method

Author

Manickam Iswarya, Ramachandran Raja, Grienggrai Rajchakit, Jinde Cao, Jehad Alzabut, and Chuangxia Huang

Subjects

discrete-time bamnns, periodic solution, coincidence degree theory, exponential stability, krichhoff’s matrix tree theorem, time-varying delays, Mathematics, QA1-939

Abstract

In this work, a general class of discrete time bidirectional associative memory (BAM) neural networks (NNs) is investigated. In this model, discrete and continuously distributed time delays are taken into account. By utilizing this novel method, which incorporates the approach of Kirchhoff’s matrix tree theorem in graph theory, Continuation theorem in coincidence degree theory and Lyapunov function, we derive a few sufficient conditions to ensure the existence, uniqueness and exponential stability of the periodic solution of the considered model. At the end of this work, we give a numerical simulation that shows the effectiveness of this work.

Published

2019

48. A New Gronwall–Bellman Inequality in Frame of Generalized Proportional Fractional Derivative

Author

Jehad Alzabut, Weerawat Sudsutad, Zeynep Kayar, and Hamid Baghani

Subjects

Gronwall–Bellman inequality, proportional fractional derivative, Riemann–Liouville and Caputo proportional fractional initial value problem, Mathematics, QA1-939

Abstract

New versions of a Gronwall−Bellman inequality in the frame of the generalized (Riemann−Liouville and Caputo) proportional fractional derivative are provided. Before proceeding to the main results, we define the generalized Riemann−Liouville and Caputo proportional fractional derivatives and integrals and expose some of their features. We prove our main result in light of some efficient comparison analyses. The Gronwall−Bellman inequality in the case of weighted function is also obtained. By the help of the new proposed inequalities, examples of Riemann−Liouville and Caputo proportional fractional initial value problems are presented to emphasize the solution dependence on the initial data and on the right-hand side.

Published

2019

49. On the Oscillation of Non-Linear Fractional Difference Equations with Damping

Author

Jehad Alzabut, Velu Muthulakshmi, Abdullah Özbekler, and Hakan Adıgüzel

Subjects

oscillation of solutions, non-linear fractional difference equation, damping term, Mathematics, QA1-939

Abstract

In studying the Riccati transformation technique, some mathematical inequalities and comparison results, we establish new oscillation criteria for a non-linear fractional difference equation with damping term. Preliminary details including notations, definitions and essential lemmas on discrete fractional calculus are furnished before proceeding to the main results. The consistency of the proposed results is demonstrated by presenting some numerical examples. We end the paper with a concluding remark.

Published

2019

50. Hybrid Control Scheme for Projective Lag Synchronization of Riemann–Liouville Sense Fractional Order Memristive BAM NeuralNetworks with Mixed Delays

Author

Grienggrai Rajchakit, Anbalagan Pratap, Ramachandran Raja, Jinde Cao, Jehad Alzabut, and Chuangxia Huang

Subjects

memristive BAM neural networks, hybrid control, mixed delays, synchronization, Mathematics, QA1-939

Abstract

This sequel is concerned with the analysis of projective lag synchronization of Riemann−Liouville sense fractional order memristive BAM neural networks (FOMBNNs) with mixed time delays via hybrid controller. Firstly, a new type of hybrid control scheme, which is the combination of open loop control and adaptive state feedback control is designed to guarantee the global projective lag synchronization of the addressed FOMBNNs model. Secondly, by using a Lyapunov−Krasovskii functional and Barbalet’s lemma, a new brand of sufficient criterion is proposed to ensure the projective lag synchronization of the FOMBNNs model considered. Moreover, as special cases by using a hybrid control scheme, some sufficient conditions are derived to ensure the global projective synchronization, global complete synchronization and global anti-synchronization for the FOMBNNs model considered. Finally, numerical simulations are provided to check the accuracy and validity of our obtained synchronization results.

Published

2019